Math, asked by mohamedastral, 11 months ago

Form a quadratic polynomial whose zeroes are 3-√5 and 3+√5

Answers

Answered by vaibhavlspise2001
1

Answer:

(3-√5)(3+√5)=4=multiplication of roots or ab

3-√5+3+√5=6=addition of roots

or a+b

genral equation of qudratic

x²-(a+b)x+ab=0

so equation is

x²-6x+5=0

hope it is helpful


mohamedastral: Thank you bro
mohamedastral: How 6 came? I think 3plus3
vaibhavlspise2001: yes u are right
vaibhavlspise2001: plz mark as brainlist
Answered by Anonymous
2

The quadratic polynomial whose zeroes are,

5 \sqrt{3} ,5 -  \sqrt{3}

 \alpha , \beta  \: is \: f(x) = k[ {x}^{2} - ( \alpha  +  \beta )x +  \alpha  \times  \beta  ]

where k is any non-zero real no.

THE QUADRATIC POLY POLYNOMIAL WHOSE ZEROES ARE

5 \sqrt{3} ,5 -  \sqrt{3}

 f(x) = k[ {x}^{2} - ( \alpha  +  \beta )x +  \alpha  \times  \beta  ]

 f(x) = k[ {x}^{2} - ( 5  \cancel{ +  \sqrt{3}}  + 5  \cancel{ -  \sqrt{3}} )x +    (5 +  \sqrt{3}   ) (5 -  \sqrt{3}  ) ]

 f(x) = k[ {x}^{2} -10x + ( {5)}^{2}  -  ({ \sqrt{3} )}^{2}  ]

 f(x) = k[ {x}^{2} -10x + (25  - 3)]

 f(x) = k[ {x}^{2} -10x + 22]

so, the QUADRATIC polynomial is

 f(x) = k[ {x}^{2} -10x + 22]

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